Novel 2D Photonic Crystals Structures
Christopher J. Summers,Curtis W. Neff and Tsuyoshi Yamashita
School of Materials Science and Engineering Georgia Institute of Technology
Atlanta, Georgia 30332-0245www.nanophotonics.gatech.edu
First International Symposium on Optoelectronicsin Optics Valley of China
Wuhan, China2rd – 4th November, 2005
Photonic Crystal ProgramsOverview
• 3D Photonic Crystal Structures– PC Micro-cavities, Phosphors
– Atomic Layer Epitaxy: Templating
– Inverse/Non Close Packed Opals
– Holographic Templates
• 2D Photonic Crystal Waveguides– Triangular and Square lattices– Superlattices – triangular based– Non-Linear Structures
2D Photonic Crystal Program
• 2D Photonic Crystal Structures
– “Virtual Waveguides” Low divergent propagation in slab waveguides
– “Fabry-Perot Etalons” – spectral tuning• 2D Superlattice Photonic Crystal Waveguide Structures
– Superlattices – triangular based – Static; Hybrid; E/O superlattice– Non-Linear Structures
• Liquid Crystal Infiltration of 2D PC• Non-linear & Electro-Optical (EO) materials
• Impact of New Structures & Materials – Tunable effects
Virtual Waveguide Interconnect System
• Advantages of free-space optics– No coupling– Intersections allowed– Broadband operation
• Advantages of integrated optics– Confined beams– No hermetic packaging– One lithography step
• Disadvantages– Small feature sizes required
(beam size ~15a)– Compared to 2-3a for line
defect PC waveguides• PC mirrors have lower PBG
1550nm 8.55µm
1555nm 9.97µm
1545nm 7.12µm
• Collimation exploits same phenomena as sub-wavelength focusing
Beam PropertiesDivergence Angle of 2D Gaussian Beam
A Gaussian beam spreads in the paraxial approximation in an isotropic material as:
The divergence determines the coupling efficiency into the photonic crystal
02 πωλθ
=∆
=z
x
kk
2ω0
x
z
02 πωλθ
=∆
=z
x
kk
Analysis of 2D Photonic CrystalsSquare Lattice
• Band Diagram– Boundaries of the
band surface– Identification of
band gaps
• Allowed Wave Vector Curve– Equifrequency curves of
the band surface– Identification of
propagation effects
Γ
Μ
Χ
)(0 ωkn Χ
Region of interest
Band Gap
• Square lattice– Hole diameter– Refractive index
Concavity Reversal Near Brillouin Zone Boundaries
• First band concavity reverses near the M point in a square lattice• Dispersion curve approximately linear and normal to the Γ-M direction
near the concavity reversal• Robust to small fluctuations in λ and r • Provides orthogonal grid of propagation for ease of design• First band guarantees confinement along the thickness of the waveguide
r=0.2a, εmatrix=2, εpillars=11
Dispersion Curve Analysisof Square Lattice PC
4/w0
2π/a
Isotropic Media Photonic Crystal
Collimated Beam
Normal Propagation
Negative Index Effect
∞=
∞=
z
z
µε
negativenegative
z
z
=
=
µε
• PC lattice designed to produce dispersion contourswith a wide range of curvatures
– Concave – normal propagation -- defocusing– Straight – collimated beam guiding– Convex – negative index for sub-wavelength
focusing
• Canceling of Z-component leads to self-collimation• Effective negative index for the energy propagation obtained
Self-Collimated Beams in FDTD Simulation
• FDTD simulation of self-collimation- ωn = 0.26 - λ = 1.55mm
• Clear intensity confinement in photonic crystal– ~25x longer propagation
possible than in air– No discernable beam spread
for 120µm of propagation of a 8.5µm wide beam
• Beam spread decreased by an order of magnitude or more with beam sizes as small as 5-10 λ0
Air
• Applications include:– Virtual waveguide interconnect system– Miniaturization of conventional optical
components for small beams
Photonic Crystal
Test Structure Design for Collimation
• Principle of operation– Gaussian like input from input
waveguide– Beam spread observable from
number of lit output waveguides
• Quality requirement– Smooth surfaces (
Test Structures of “Virtual Waveguide”
• Input waveguide, photonic crystal, fan of waveguides for analysis• Examples of photonic crystal fabrication.
Direct Top-View Measurements
Input from the fiber Propagation thru the photonic crystal
Output from the waveguides
Photonic Crystal
• Infrared camera utilized to view scattered light from the device
Measurements of Virtual Waveguide Effect
• Test structure with no photonic crystal:– Approximately 8 WGs lit up
Χ
• Test structure with “virtual waveguide” photonic crystal:– Only central waveguide lit up
• Very good beam collimation in PC
Applications:Fabry-Perot Interferometer
• Beam spread degrades performance– Beam size– Intensity leaks backward (98% transmitted center intensity
for mode near self-collimation– Can control bandwidth for
selecting number and intensity of transmitted beams
• Concept extends to other interferometers and bulk optical devices
Photonic crystal No photonic crystal
Transmitted intensity at center of beam
Propagation Effects in Superlattice PCs
• Giant refraction
• Superprism
• Tunable refraction
Two Dimensional PC: Triangular Lattice
• Simpler structure than 3D• Top-down fabrication• Integration with planar
circuits• Simpler analysis of optical
properties than 3D• Can have full PBG (light
in plane of PC)• Giant refraction effects• Superprism effects
x
y
Ex
HzEy
TE polarization Real Space
• Band diagram: Plot of dispersion relationship, ω(k), along irreducible BZ boundary
Reciprocal Space Band Diagram
Superlattice: Real & Reciprocal Space
• Alternating rows posses different property (∆r, ∆n, or both)
• Unit cell definition with two holes per lattice point
Reciprocal SpaceReal Space
aa2
a1
Γ Χ
ΜΥb2
b1
• New BZ representation: hexagonal becomes rectangular
• BZ folding• Symmetry reduction: six-fold to two-
fold
row i
row j
Dispersion Diagram Energy Dependence
• Dispersion diagram: constant energy contour in 1st BZ• Homogeneous medium circle• Photonic crystal complex in shape
0.0
0.1
0.2
0.3
0.4
0.5
0.6
0.7
0.8
0.9
1.0
Γ MK K0.0
0.1
0.2
0.3
0.4
0.5
0.6
0.7
0.8
0.9
1.0
Γ MK K
F re q
u enc
y (E
n er g
y )
Wave vector (ka/2π)
ZnS/Air Triangular Lattice
E = 0.43
• Propagation of light normal to the dispersion curve, in direction of energy flow
E = 0.25
M
K
K
M
Static Superlattice Photonic CrystalSuperlattice Strength: r2/r1
• Superlattice: hole radii, r1 & r2, in adjacent rows [i, j], respectively, Lattice vector a• Increasing superlattice strength accomplished by increasing ∆n or ∆r between rows
• Strength of superlattice defined as: extra dielectric added when r2 made smaller, r2/r1 ratio
• In Si, for r2/r1=0.857, neff=1.654 which is ∆n=0.654 between rows of holes• To increase the strength of the superlattice. The radius of the columns of row j
is decreased down to ∆r2=0.15a while r1 is kept constant
Effect of SL Strength (r2/r1) on Band Structure (∆r)
• Decreasing r2 increases dielectric material in structure
• Stronger effect on air bands than dielectric bands
• Shifts bands to lower frequencies
• Decreases width of PBG
• Increases band splitting
• Similar effect in dynamic superlattice when changing ∆n
TE polarization
• Evolution of a static superlattice band structure with radius ratio(a) r2/r1 = 1, (b) r2/r1 = 0.857, (c) r2/r1 = 0.571
Energy Density of Static Superlattice
• a & b --- Degenerate states at bottom of air band at M-point ∆-lattice• c & d --- 3s and 3p states of the 2D PC-SL with strength 0.571
2D PC-SL with strength 0.571
∆−lattice
Μ−point
Dispersion Contours: Dependence on r2/r1
r2/r1=1.0ωn= 0.435
Γ
Υ
Υ
Χ
Μ
Μ
r2/r1=0.571ωn= 0.366
Γ
Υ
Υ
Χ
Μ
Μ
• For ∆r = 0, (r2/r1=1), BZ folding scheme straight forward: curves converge to a single point at BZ boundaries.
• Radius modulation (r2/r1
Fabrication
• E-beam lithography• ICP dry etching with
Chlorine/C4F6 recipe• 1 mm2 area written using
smaller unit patterns• Lattice constant: a=358 nm • Silicon slab waveguide (SWG)
Si
1 µm
~300 nm SiO2
Si
Triangular Lattice SL Lattice
Superlattice: Measured & Calculated Bands
• Dips in spectrum filtered and plotted as ω vs. k• Full 3D FDTD calculations to match structure
400 nm
FDTDcalculatedbands
Measuredbands
Γ
X M
Y
Tunable Structures
• Concept:– Dynamically
change lattice property, i.e. refractive index, while under excitation
• Consequences:– Active beam
steering– Tunable filtering– Signal
modulation
Superlattice Photonic Crystal StructuresBased on Triangular Lattice
Triangular Lattice Dynamic SL
Static SL
Static E/O
• ‘Dynamic’: Row addressing scheme to modulate n (Park et al., PECS IV 2002) Static Infiltrated
Dynamic Hybrid
• ‘Static’: Modulation in hole radius• ‘Static E/O’ SL allows tunability of optical properties
(Neff et al., SPIE 2004)
• Dynamic liquid infiltration of holes• Static holes of different diameter• Hybrid – combination of both structures
Dispersion Surfaces for First Four Bands of SSL Structures
Band 3pBand 3s
Band Structure and DispersionLarge Area Addressed Static Infiltrated Superlattice
Band StructureDispersion Contours Refraction
• Changing bias/unbias state changes alignment of LC director changes ε– Changes band structure– Changes dispersion contours– Changes refraction response
Biasedε = 2.25
Unbiasedε = 2.89
Dispersion Contours and Refraction forThree SSL Devices -3s Band
• For Hybrid Static superlattice, refraction changes from negative to positive with bias∆θr = 96o – of the order of 80o for other structures
• (a & d) EO superlattice, (b & e) Hybrid Static superlattice, (c & f) inter-digitated SL Case 1: larger holes unbiased (eh1 = 2.89), smaller holes biased (eh2 = 2.25). .
Positive & Negative Refraction
• Positive refraction ‘Snell’s law’ like refraction, i.e. n is positive
• Negative refraction n is negative in Snell’s law
• Square and Triangular PCs only negative OR only
positive at a fixed frequency
• SL PC Both regimes at a fixed frequency
Dispersion Contours for SSL-Structures & Spectral Dispersion Properties
• TE polarization dispersion contours for SSL structure calculated with PWE method – SL strength of 1.0 (solid line) and 0.857 (dashed line)
• FDTD method for SL strength of 0.857 (scattered dots), • Gray lines show construction lines for a beam of wn = 0.3185 incident from air • Spectral Dispersion for r2/r1 = 0.857 for range of wn with 1% spacing between
frequencies (group of lines) 2D slab waveguide structure (scattered plot)
FDTD Visualization of Refraction in SSL
• Investigation of effect coherence on refraction
Static superlattice structure
• Static SL PC surrounded by silicon• Gaussian beam: launched at incident angles
of 0 and 12o. Width 24a.• Beam steering:
• -40.5o for θi = 0 • 47.15o for θi = 12o
• SL parameters r1=0.35a and r2=0.3a• SL strength: r2/r1 = 0.875
2D Photonic Crystal Structures
• Control Over Dispersion Surface– Low Divergence “virtual waveguides”
• Beam divergence reduced by factor of ~10• Optical interconnects• Sensor Technologies
– Fabry-Perot Interferometer• Suitable for wavelength selection, beam width control• Chemical and Biological Sensing
– Negative Index Structures• Pendry lens: Refractive Index of -1
2D Superlattice Structures
• Successfully developed new concept of SL PC– Experimentally observed ‘band folding’ effect
• Demonstrated that SL significantly enhances tunability, by order of magnitude, for refraction & dispersion
• SL introduces unique optical properties and new regimes for beam propagation effects− ∆r or ∆n between adjacent rows of holes creates a SL photonic crystal-
Greater sensitivity to ∆n by optimization of hole size ratio, r2/r1– The superlattice lowers the symmetry of the structure causing:
• BZ folding: Band splitting removal of modal degeneracy• Highly curved Dispersion Contours near BZ boundaries• Positive and negative refraction• Beam steering of > 90 degrees
• Hybrid superlattice enhances tunability of optical properties
Acknowledgements
Research GroupGraduate Students
• Davy Gaillot
• Xudong Wang
• Swati Jain
Postdoctoral Researchers
• Dr. Elton Graugnard,
• Dr. Jeff King
• Faculty & Staff of MiRC
Collaborations with ARL: Drs. D. Morton, E. Forsythe &S. Blomquist
Supported by U.S. Army Research Office under contract MURI project DAAD19-01-1-0603
Thank You!!
Novel 2D Photonic Crystals StructuresPhotonic Crystal ProgramsOverview2D Photonic Crystal ProgramVirtual Waveguide Interconnect SystemBeam PropertiesDivergence Angle of 2D Gaussian BeamAnalysis of 2D Photonic CrystalsSquare LatticeConcavity Reversal Near Brillouin Zone BoundariesDispersion Curve Analysisof Square Lattice PCSelf-Collimated Beams in FDTD SimulationTest Structure Design for CollimationTest Structures of “Virtual Waveguide”Direct Top-View MeasurementsMeasurements of Virtual Waveguide EffectApplications:Fabry-Perot InterferometerPropagation Effects in Superlattice PCsTwo Dimensional PC: Triangular LatticeSuperlattice: Real & Reciprocal SpaceDispersion Diagram Energy DependenceStatic Superlattice Photonic Crystal Superlattice Strength: r2/r1Effect of SL Strength (r2/r1) on Band Structure (Dr)Energy Density of Static SuperlatticeDispersion Contours: Dependence on r2/r1FabricationSuperlattice: Measured & Calculated BandsTunable StructuresSuperlattice Photonic Crystal StructuresBased on Triangular LatticeDispersion Surfaces for First Four Bands of SSL StructuresBand Structure and DispersionLarge Area Addressed Static Infiltrated SuperlatticeDispersion Contours and Refraction forThree SSL Devices -3s BandPositive & Negative RefractionDispersion Contours for SSL-Structures & Spectral Dispersion PropertiesFDTD Visualization of Refraction in SSL2D Photonic Crystal Structures2D Superlattice StructuresAcknowledgements
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